TY - THES A1 - Reinwand, Simon T1 - Functions of Bounded Variation: Theory, Methods, Applications T1 - Funktionen beschränkter Variation: Theorie, Methoden, Anwendungen N2 - Functions of bounded variation are most important in many fields of mathematics. This thesis investigates spaces of functions of bounded variation with one variable of various types, compares them to other classical function spaces and reveals natural “habitats” of BV-functions. New and almost comprehensive results concerning mapping properties like surjectivity and injectivity, several kinds of continuity and compactness of both linear and nonlinear operators between such spaces are given. A new theory about different types of convergence of sequences of such operators is presented in full detail and applied to a new proof for the continuity of the composition operator in the classical BV-space. The abstract results serve as ingredients to solve Hammerstein and Volterra integral equations using fixed point theory. Many criteria guaranteeing the existence and uniqueness of solutions in BV-type spaces are given and later applied to solve boundary and initial value problems in a nonclassical setting. A big emphasis is put on a clear and detailed discussion. Many pictures and synoptic tables help to visualize and summarize the most important ideas. Over 160 examples and counterexamples illustrate the many abstract results and how delicate some of them are. N2 - Funktionen beschränkter Variation sind in vielen Bereichen der Mathematik besonders wichtig. Diese Dissertation untersucht Räume von Funktionen einer Variable von beschränkter Variation unterschiedlichen Typs, vergleicht sie mit klassischen Funktionenräumen und enthüllt natürliche „Lebensräume“ von BV-Funktionen. Neue und umfassende Ergebnisse über Abbildungseigenschaften wie Surjektivität und Injektivität, verschiedene Arten von Stetigkeit und Kompaktheit von linearen und nichtlinearen Operatoren zwischen solchen Räumen werden präsentiert. Eine neue Theorie über verschiedene Konvergenzarten von solchen Operatoren wird entwickelt und schließlich auf einen neuen Beweis für die Stetigkeit des Kompositionsoperators im klassischen BV-Raum angewendet. Diese abstrakten Ergebnisse dienen als Zutat für die Lösung von Hammerstein- und Volterra-Integralgleichungen mithilfe von Fixpunktsätzen. Diese liefern viele Kriterien, welche die Existenz und Eindeutigkeit von Lösungen garantieren, die sodann auf Anfangs- und Randwertprobleme in einem nichtklassischen Setting angewendet werden. Besonders Augenmerk liegt auf einer klaren und detaillierte Darstellung. Viele Abbildungen und Tabellen helfen, die wichtigsten Ideen zu visualisieren und zusammenzufassen. Über 160 Beispiele und Gegenbeispiele illustrieren die abstrakten Ergebnisse und zeigen deren Grenzen. KW - Funktion von beschränkter Variation KW - Nichtlinearer Operator KW - Integralgleichung KW - Fixpunktsatz KW - Gleichmäßige Konvergenz KW - Mapping Properties KW - Abbildungseigenschaften KW - Functions with Primitive KW - Funktionen mit Stammfunktion KW - Linearer Operator KW - Operatortheorie Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-235153 SN - 9783736974036 PB - Cuvillier-Verlag, Göttingen ER - TY - THES A1 - Wenz, Andreas T1 - Computation of Belyi maps with prescribed ramification and applications in Galois theory T1 - Berechnung von Belyi-Funktionen mit vorgegebener Monodromiegruppe und Anwendungen in der Galoistheorie N2 - We compute genus-0 Belyi maps with prescribed monodromy and strictly verify the computed results. Among the computed examples are almost simple primitive groups that satisfy the rational rigidity criterion yielding polynomials with prescribed Galois groups over Q(t). We also give an explicit version of a theorem of Magaard, which lists all sporadic groups occurring as composition factors of monodromy groups of rational functions. N2 - Wir berechnen Geschlecht-0 Belyi-Funktionen mit vorgegebener Monodromiegruppe und liefern rigorose Verifikationsbeweise. Unter den berechneten Exemplaren finden sich fast-einfache primitive Gruppen, welche das sogenannte "Rationale-Starrheitskriterium" erfüllen, die zu Galois-Realisierungen über Q(t) führen. Außerdem liefern wir eine explizite Version eines Satzes von Magaard, der alle sporadischen Gruppen auflistet, die als Kompositionsfaktoren von Monodromiegruppen rationaler Funktionen auftreten. KW - Galois-Theorie KW - Überlagerung KW - Belyi map KW - Explicit Computation KW - Belyi-Funktionen KW - Explizite Berechnung Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-240838 ER - TY - JOUR A1 - Kanzow, Christian A1 - Raharja, Andreas B. A1 - Schwartz, Alexandra T1 - An Augmented Lagrangian Method for Cardinality-Constrained Optimization Problems JF - Journal of Optimization Theory and Applications N2 - A reformulation of cardinality-constrained optimization problems into continuous nonlinear optimization problems with an orthogonality-type constraint has gained some popularity during the last few years. Due to the special structure of the constraints, the reformulation violates many standard assumptions and therefore is often solved using specialized algorithms. In contrast to this, we investigate the viability of using a standard safeguarded multiplier penalty method without any problem-tailored modifications to solve the reformulated problem. We prove global convergence towards an (essentially strongly) stationary point under a suitable problem-tailored quasinormality constraint qualification. Numerical experiments illustrating the performance of the method in comparison to regularization-based approaches are provided. KW - quasinormality constraint qualification KW - cardinality constraints KW - augmented Lagrangian KW - global convergence KW - stationarity Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-269166 SN - 1573-2878 VL - 189 IS - 3 ER - TY - JOUR A1 - Hellmuth, Kathrin A1 - Klingenberg, Christian A1 - Li, Qin A1 - Tang, Min T1 - Multiscale convergence of the inverse problem for chemotaxis in the Bayesian setting JF - Computation N2 - Chemotaxis describes the movement of an organism, such as single or multi-cellular organisms and bacteria, in response to a chemical stimulus. Two widely used models to describe the phenomenon are the celebrated Keller–Segel equation and a chemotaxis kinetic equation. These two equations describe the organism's movement at the macro- and mesoscopic level, respectively, and are asymptotically equivalent in the parabolic regime. The way in which the organism responds to a chemical stimulus is embedded in the diffusion/advection coefficients of the Keller–Segel equation or the turning kernel of the chemotaxis kinetic equation. Experiments are conducted to measure the time dynamics of the organisms' population level movement when reacting to certain stimulation. From this, one infers the chemotaxis response, which constitutes an inverse problem. In this paper, we discuss the relation between both the macro- and mesoscopic inverse problems, each of which is associated with two different forward models. The discussion is presented in the Bayesian framework, where the posterior distribution of the turning kernel of the organism population is sought. We prove the asymptotic equivalence of the two posterior distributions. KW - inverse problems KW - Bayesian approach KW - kinetic chemotaxis equation KW - Keller–Segel model KW - multiscale modeling KW - asymptotic analysis KW - velocity jump process KW - mathematical biology Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-250216 SN - 2079-3197 VL - 9 IS - 11 ER - TY - JOUR A1 - Tongsomporn, Janyarak A1 - Wananiyakul, Saeree A1 - Steuding, Jörn T1 - The values of the periodic zeta-function at the nontrivial zeros of Riemann's zeta-function JF - Symmetry N2 - In this paper, we prove an asymptotic formula for the sum of the values of the periodic zeta-function at the nontrivial zeros of the Riemann zeta-function (up to some height) which are symmetrical on the real line and the critical line. This is an extension of the previous results due to Garunkštis, Kalpokas, and, more recently, Sowa. Whereas Sowa's approach was assuming the yet unproved Riemann hypothesis, our result holds unconditionally. KW - zeta-functions KW - Riemann hypothesis Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-252261 SN - 2073-8994 VL - 13 IS - 12 ER - TY - JOUR A1 - Greefrath, Gilbert A1 - Oldenburg, Reinhard A1 - Siller, Hans-Stefan A1 - Ulm, Volker A1 - Weigand, Hans-Georg T1 - Basic Mental Models of Integrals - Theoretical Conception, Development of a Test Instrument, and first Results JF - ZDM – Mathematics Education N2 - A basic mental model (BMM—in German ‘Grundvorstellung’) of a mathematical concept is a content-related interpretation that gives meaning to this concept. This paper defines normative and individual BMMs and concretizes them using the integral as an example. Four BMMs are developed about the concept of definite integral, sometimes used in specific teaching approaches: the BMMs of area, reconstruction, average, and accumulation. Based on theoretical work, in this paper we ask how these BMMs could be identified empirically. A test instrument was developed, piloted, validated and applied with 428 students in first-year mathematics courses. The test results show that the four normative BMMs of the integral can be detected and separated empirically. Moreover, the results allow a comparison of the existing individual BMMs and the requested normative BMMs. Consequences for future developments are discussed. KW - basic mental model KW - Grundvorstellung KW - integral KW - empirical evidence KW - approaches in textbooks Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-232830 SN - 1863-9690 VL - 53 ER - TY - JOUR A1 - Haack, J. A1 - Hauck, C. A1 - Klingenberg, C. A1 - Pirner, M. A1 - Warnecke, S. T1 - A Consistent BGK Model with Velocity-Dependent Collision Frequency for Gas Mixtures JF - Journal of Statistical Physics N2 - We derive a multi-species BGK model with velocity-dependent collision frequency for a non-reactive, multi-component gas mixture. The model is derived by minimizing a weighted entropy under the constraint that the number of particles of each species, total momentum, and total energy are conserved. We prove that this minimization problem admits a unique solution for very general collision frequencies. Moreover, we prove that the model satisfies an H-Theorem and characterize the form of equilibrium. KW - plasma physics KW - multi-fluid mixture KW - kinetic model KW - BGK approximation KW - velocity-dependent collision frequency KW - entropy minimization Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-269146 SN - 1572-9613 VL - 184 IS - 3 ER - TY - JOUR A1 - Kanzow, Christian A1 - Raharja, Andreas B. A1 - Schwartz, Alexandra T1 - Sequential optimality conditions for cardinality-constrained optimization problems with applications JF - Computational Optimization and Applications N2 - Recently, a new approach to tackle cardinality-constrained optimization problems based on a continuous reformulation of the problem was proposed. Following this approach, we derive a problem-tailored sequential optimality condition, which is satisfied at every local minimizer without requiring any constraint qualification. We relate this condition to an existing M-type stationary concept by introducing a weak sequential constraint qualification based on a cone-continuity property. Finally, we present two algorithmic applications: We improve existing results for a known regularization method by proving that it generates limit points satisfying the aforementioned optimality conditions even if the subproblems are only solved inexactly. And we show that, under a suitable Kurdyka–Łojasiewicz-type assumption, any limit point of a standard (safeguarded) multiplier penalty method applied directly to the reformulated problem also satisfies the optimality condition. These results are stronger than corresponding ones known for the related class of mathematical programs with complementarity constraints. KW - augmented Lagrangian method KW - cardinality constraints KW - sequential optimality condition KW - conecontinuity type constraint qualification KW - relaxation method Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-269052 SN - 1573-2894 VL - 80 IS - 1 ER - TY - THES A1 - Berberich, Jonas Philipp T1 - Fluids in Gravitational Fields – Well-Balanced Modifications for Astrophysical Finite-Volume Codes T1 - Fluide in Gravitationsfeldern - Wohl-Balancierte Modifikationen für Astrophysikalische Finite-Volumen-Codes N2 - Stellar structure can -- in good approximation -- be described as a hydrostatic state, which which arises due to a balance between gravitational force and pressure gradient. Hydrostatic states are static solutions of the full compressible Euler system with gravitational source term, which can be used to model the stellar interior. In order to carry out simulations of dynamical processes occurring in stars, it is vital for the numerical method to accurately maintain the hydrostatic state over a long time period. In this thesis we present different methods to modify astrophysical finite volume codes in order to make them \emph{well-balanced}, preventing them from introducing significant discretization errors close to hydrostatic states. Our well-balanced modifications are constructed so that they can meet the requirements for methods applied in the astrophysical context: They can well-balance arbitrary hydrostatic states with any equation of state that is applied to model thermodynamical relations and they are simple to implement in existing astrophysical finite volume codes. One of our well-balanced modifications follows given solutions exactly and can be applied on any grid geometry. The other methods we introduce, which do no require any a priori knowledge, balance local high order approximations of arbitrary hydrostatic states on a Cartesian grid. All of our modifications allow for high order accuracy of the method. The improved accuracy close to hydrostatic states is verified in various numerical experiments. N2 - Die Struktur von Sternen kann in guter Näherung als hydrostatischer Zustandbeschrieben werden, der durch ein Gleichgewicht zwischen Gravitationskraft undDruckgradient gegeben ist. Hydrostatische Zustände sind statische Lösungen dervollständigen komprimierbaren Euler-Gleichungen mit Gravitationsquellenterm, diezur Modellierung des Sterninneren verwendet werden können. Um Simulationendynamischer Prozesse in Sternen durchführen zu können, ist es wichtig, dass dieverwendete numerische Methode den hydrostatischen Zustand über einen langenZeitraum genau aufrechterhalten kann. In dieser Arbeit stellen wir verschiedene Me-thoden vor, um astrophysikalische Finite-Volumen-Codes so zu modifizieren, dasssie diewell-balancing-Eigenschaft erhalten, d.h., dass sie keine signifikanten Diskre-tisierungsfehler nahe hydrostatischer Zustände verursachen. Unsere well-balancing-Modifikationen sind so konstruiert, dass sie die Anforderungen für Methoden er-füllen, die im astrophysikalischen Kontext angewendet werden: Sie können beliebi-ge hydrostatische Zustände mit jeder Zustandsgleichung, die zur Modellierung derthermodynamischen Beziehungen angewendet wird, balancieren und sind einfach invorhandene astrophysikalische Finite-Volumen-Codes zu implementieren. Eine un-serer well-balancing Modifikationen erhält bekannte Lösungen exakt und kann aufjede Gittergeometrie angewendet werden. Die anderen Methoden, für die keine A-priori-Kenntnisse erforderlich sind, balancieren lokale Approximationen beliebigerhydrostatischer Zustände mit hoher Fehlerordnung auf einem kartesischen Gitter.Alle unsere Modifikationen erlauben eine hohe Fehlerordnung der Methode. Dieverbesserte Genauigkeit nahe an hydrostatischen Zuständen wird in verschiedenennumerischen Experimenten verifiziert. KW - well-balancing KW - Euler equations KW - finite volume methods KW - Fluid KW - Gravitationsfeld KW - Finite-Volumen-Methode Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-219679 ER - TY - THES A1 - Mönius, Katja T1 - Algebraic and Arithmetic Properties of Graph Spectra T1 - Algebraische und Arithmetische Eigenschaften von Graph Spektren N2 - In the present thesis we investigate algebraic and arithmetic properties of graph spectra. In particular, we study the algebraic degree of a graph, that is the dimension of the splitting field of the characteristic polynomial of the associated adjacency matrix over the rationals, and examine the question whether there is a relation between the algebraic degree of a graph and its structural properties. This generalizes the yet open question ``Which graphs have integral spectra?'' stated by Harary and Schwenk in 1974. We provide an overview of graph products since they are useful to study graph spectra and, in particular, to construct families of integral graphs. Moreover, we present a relation between the diameter, the maximum vertex degree and the algebraic degree of a graph, and construct a potential family of graphs of maximum algebraic degree. Furthermore, we determine precisely the algebraic degree of circulant graphs and find new criteria for isospectrality of circulant graphs. Moreover, we solve the inverse Galois problem for circulant graphs showing that every finite abelian extension of the rationals is the splitting field of some circulant graph. Those results generalize a theorem of So who characterized all integral circulant graphs. For our proofs we exploit the theory of Schur rings which was already used in order to solve the isomorphism problem for circulant graphs. Besides that, we study spectra of zero-divisor graphs over finite commutative rings. Given a ring \(R\), the zero-divisor graph over \(R\) is defined as the graph with vertex set being the set of non-zero zero-divisors of \(R\) where two vertices \(x,y\) are adjacent if and only if \(xy=0\). We investigate relations between the eigenvalues of a zero-divisor graph, its structural properties and the algebraic properties of the respective ring. N2 - In der vorliegenden Dissertation untersuchen wir algebraische und arithmetische Eigenschaften von Graph Spektren. Insbesondere studieren wir den algebraischen Grad eines Graphen, d.h. die Dimension des Zerfällungskörpers des charakteristischen Polynoms der zugehörigen Adjazenzmatrix über den rationalen Zahlen, und beschäftigen uns mit der Frage, ob es einen Zusammenhang zwischen dem algebraischen Grad eines Graphen und seinen strukturellen Eigenschaften gibt. Dies verallgemeinert die bis heute noch offene Fragestellung "Welche Graphen haben ganzzahliges Spektrum?", welche 1974 von Harary und Schwenk aufgeworfen wurde. Wir geben einen Überblick über verschiedene Graphprodukte, da diese oftmals hilfreich sind bei der Untersuchung von Graph Spektren, und konstruieren damit Familien von integralen Graphen. Außerdem stellen wir einen Zusammenhang zwischen dem Diameter, dem maximalen Eckengrad und dem algebraischen Grad von Graphen vor, und konstruieren eine potenzielle Familie von Graphen, welche alle maximalen algebraischen Grad haben. Zudem bestimmen wir den algebraischen Grad zirkulärer Graphen und finden neue Kriterien für Isospektralität solcher Graphen. Darüber hinaus lösen wir das inverse Galois Problem für zirkuläre Graphen, indem wir zeigen, dass jede endliche abelsche Erweiterung der rationalen Zahlen Zerfällungskörper eines zirkulären Graphen ist. Diese Resultate verallgemeinern einen Satz von So, in dem sämtliche integrale zirkuläre Graphen charakterisiert werden. Für unsere Beweise verwenden wir die Theorie der Schur Ringe, die bereits verwendet wurde, um das Isomorphieproblem für zirkuläre Graphen zu lösen. Zu guter Letzt untersuchen wir Spektren von Nullteilergraphen über kommutativen Ringen. Zu einem gegebenen Ring \(R\) ist der zugehörige Nullteilergraph über \(R\) definiert als der Graph, dessen Eckenmenge den Nullteilern von \(R\) entspricht, und in dem je zwei Ecken \(x,y\) benachbart sind, wenn \(xy=0\) gilt. Wir studieren Zusammenhänge zwischen den Eigenwerten von Nullteilergraphen, deren strukturellen Eigenschaften und den algebraischen Eigenschaften der entsprechenden Ringe. KW - Algebraische Zahlentheorie KW - Graph KW - Graph spectrum KW - Integral graph KW - Cayley graph KW - Schur ring KW - Zero-divisor graph KW - Kombinatorik Y1 - 2021 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-230850 ER -